# How to compute the p-value in hypothesis testing (linear regression)

Currently I'm working on an `awk` script to do some statistical analysis on measurement data. I'm using linear regression to get parameter estimates, standard errors etc. and would also like to compute the p-value for a null-hypothesis test (t-test).

This is my script so far, any idea how to compute the p-value?

``````BEGIN {
ybar = 0.0
xbar = 0.0
n = 0
a0 = 0.0
b0 = 0.0
qtinf0975 = 1.960 # 5% n = inf
}

{ # y_i is in \$1, x_i has to be counted
n = n + 1
yi[n] = \$1*1.0
xi[n] = n*1.0
}

END {
for ( i = 1; i <= n ; i++ ) {
ybar = ybar + yi[i]
xbar = xbar + xi[i]
}
ybar = ybar/(n*1.0)
xbar = xbar/(n*1.0)

bhat = 0.0
ssqx = 0.0
for ( i = 1; i <= n; i++ ) {
bhat = bhat + (yi[i] - ybar)*(xi[i] - xbar)
ssqx = ssqx + (xi[i] - xbar)*(xi[i] - xbar)
}
bhat = bhat/ssqx
ahat = ybar - bhat*xbar

print "n: ", n
print "alpha-hat: ", ahat
print "beta-hat: ", bhat

sigmahat2 = 0.0
for ( i = 1; i <= n; i++ ) {
ri[i] = yi[i] - (ahat + bhat*xi[i])
sigmahat2 = sigmahat2 + ri[i]*ri[i]
}
sigmahat2 = sigmahat2 / ( n*1.0 - 2.0 )

print "sigma-hat square: ", sigmahat2

seb = sqrt(sigmahat2/ssqx)

print "se(b): ", seb

sigmahat = sqrt((seb*seb)*ssqx)
print "sigma-hat: ", sigma
sea = sqrt(sigmahat*sigmahat * ( 1 /(n*1.0) + xbar*xbar/ssqx))

print "se(a): ", sea

# Tests

print "q(inf)(97.5%): ", qtinf0975

Tb = (bhat - b0) / seb
if ( qtinf0975 > Tb )
print "T(b) plausible: ", Tb, " < ", qtinf0975
else
print "T(b) NOT plausible: ", Tb, " > ", qtinf0975

print "confidence(b): [", bhat - seb * qtinf0975,", ", bhat + seb * qtinf0975 ,"]"

Ta = (ahat - a0) / sea
if ( qtinf0975 > Ta )
print "T(a) plausible: ", Ta, " < ", qtinf0975
else
print "T(a) NOT plausible: ", Ta, " > ", qtinf0975

print "confidence(a): [", ahat - seb * qtinf0975,", ", ahat + seb * qtinf0975 ,"]"
}
``````
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OK, I've found a javascript implementation and ported it to `awk` this are the functions used to compute the p-value:

``````function statcom ( mq, mi, mj, mb )
{
zz = 1
mz = zz
mk = mi
while ( mk <= mj ) {
zz = zz * mq * mk / ( mk - mb)
mz = mz + zz
mk = mk + 2
}
return mz
}

function studpval ( mt , mn )
{
PI = 3.1415926535897932384626433832795028841971693993751058209749445923078164062862089986280348253421170679 # thank you wikipedia
if ( mt < 0 )
mt = -mt
mw = mt / sqrt(mn)
th = atan2(mw, 1)
if ( mn == 1 )
return 1.0 - th / (PI/2.0)
sth = sin(th)
cth = cos(th)
if ( mn % 2 == 1 )
return 1.0 - (th+sth*cth*statcom(cth*cth, 2, mn-3, -1))/(PI/2.0)
else
return 1.0 - sth * statcom(cth*cth, 1, mn-3, -1)
}
``````

I've integrated them like this:

``````    pvalb = studpval(Tb, n)
if ( pvalb > 0.05 )
print "p-value(b) plausible: ", pvalb, " > 0.05"
else
print "p-value(b) NOT plausible: ", pvalb, " < 0.05"

pvala = studpval(Ta, n)
if ( pvala > 0.05 )
print "p-value(a) plausible: ", pvala, " > 0.05"
else
print "p-value(a) NOT plausible: ", pvala, " < 0.05"
``````
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You're probably trying to do a paired t-test under the assumption of variance equality. I suggest you have a look at the corresponding entry in the excellent MathWorld website.

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